Fabian Brau
Published 2004-02-10Version 1
For the class of central potentials possessing a finite number of bound states and for which the second derivative of $r V(r)$ is negative, we prove, using the supersymmetric quantum mechanics formalism, that an increase of the angular momentum $\ell$ by one unit yields a decrease of the number of bound states of at least one unit: $N_{\ell+1}\le N_{\ell}-1$. This property is used to obtain, for this class of potential, an upper limit on the total number of bound states which significantly improves previously known results.
Journal: Phys. Lett. A322, 67 (2004)
The self-energy of Friedrichs-Lee models and its application to bound states and resonances
The Schrödinger particle on the half-line with an attractive $δ$-interaction: bound states and resonances
Quasiclassical and Quantum Systems of Angular Momentum. Part II. Quantum Mechanics on Lie Groups and Methods of Group Algebras
